What question did this study set out to answer?

The aim is to demonstrate that P equals NP by presenting a fragmentation method applicable to NP-complete problems.

March 13, 2026Open Access

P = NP: A Proof via Logarithmic Fragmentation of NP-Complete Problems

Puntos clave

The aim is to demonstrate that P equals NP by presenting a fragmentation method applicable to NP-complete problems.
Constructed a logarithmic fragmentation decomposition for NP-complete languages.
Used brute-force enumeration within polynomial bounds.
Provided a worked example using 3-SAT with n=2 variables.
Each fragment of NP-complete languages is decidable in deterministic polynomial time.
The entire language of NP-complete problems is shown to be in P.
All of NP collapses into P due to the completeness property under polynomial-time reductions.

Resumen

We present a proof that P = NP by constructing a logarithmic fragmentation decomposition applicable to every NP-complete language. We show that each fragment is decidable in deterministic polynomial time by brute-force enumeration bounded polynomially through the logarithmic constraint. Since every instance of every NP-complete language falls within some such fragment, the entire language is in P. By the completeness property under polynomial-time reductions, all of NP collapses into P. A concrete worked example using 3-SAT with n=2 variables is provided.

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